Complete the square in denominator per your own hint. \begin{align} I &= \int_0^{\frac 12} \frac {dx}{x^2-x+1} = \int_0^{\frac 12} \frac {dx}{\left ( x^2 -x + \frac 14\right ) + \frac 34} = ...

First,\begin{align*} S - T &= \sum_{k = 3n}^{4n - 1} \frac{1}{n^3} (k^2 - 7kn + 13n^2) - \sum_{k = 3n + 1}^{4n} \frac{1}{n^3} (k^2 - 7kn + 13n^2)\\ &= \frac{1}{n^3} ((3n)^2 - 7 \cdot 3n \cdot n + ...

You factored incorrectly. It should be: x^2−5x+6=(x−2)(x−3)

Suppose that you want to find the area of the gray part in the following figure : \qquad\qquad\qquad Then, your attempt is not true. The area is given by \int_{-3}^{-1}\left(\frac 23x+2\right)dx+\int_{-1}^{1}\left(\left(\frac 23x+2\right)-\left(\frac 13x^2+\frac 43x+1\right)\right)dx

a) Expected value of x is the sum of xf(x) for possible x, where f(x) is the probability of the event happening. In the case of a continuous function, we simply sum the rectangular prisms ...

Your partial fraction decomposition is incorrect. It should be \dfrac{x+1}{x^2(x-1)} = - \dfrac1{x^2} - \dfrac2x + \dfrac2{x-1} Hence, \begin{align} \int_{-2}^{-1}\dfrac{x+1}{x^2(x-1)} dx & = - ...